A mnemonic for the Lipshitz-Ozsv\'ath-Thurston correspondence

Abstract

When k is a field, type D structures over the algebra k[u,v]/(uv) are equivalent to immersed curves decorated with local systems in the twice-punctured disk. Consequently, knot Floer homology, as a type D structure over k[u,v]/(uv), can be viewed as a set of immersed curves. With this observation as a starting point, given a knot K in S3, we realize the immersed curve invariant HF(S3 (K)) [arXiv:1604.03466] by converting the twice-punctured disk to a once-punctured torus via a handle attachment. This recovers a result of Lipshitz, Ozsv\'ath, and Thurston [arXiv:0810.0687] calculating the bordered invariant of S3 (K) in terms of the knot Floer homology of K.